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\ No newline at end of file +\chapter{MX2} + + +We report the first coherent multidimensional spectroscopy study of a MoS\textsubscript{2} film. % +A four-layer sample of MoS\textsubscript{2} was synthesized on a silica substrate by a simplified +sulfidation reaction and characterized by absorption and Raman spectroscopy, atomic force +microscopy, and transmission electron microscopy. % +State-selective coherent multidimensional spectroscopy (CMDS) on the as-prepared +MoS\textsubscript{2} film resolved the dynamics of a series of diagonal and cross-peak features +involving the spin---orbit split A and B excitonic states and continuum states. % +The spectra are characterized by striped features that are similar to those observed in CMDS +studies of quantum wells where the continuum states contribute strongly to the initial excitation of +both the diagonal and cross-peak features, while the A and B excitonic states contributed strongly +to the final output signal. % +The strong contribution from the continuum states to the initial excitation of both the diagonal +and cross-peak features, while the A and B excitonic states contributed strongly to the final +output signal. % +The strong contribution from the continuum states to the initial excitation shows that the continuum +states are coupled to the A and B excitonic states and that fast intraband relaxation is occurring +on a sub-70 fs time scale. % +A comparison of the CMDS excitation signal and the absorption spectrum shows that the relative +importance of the continuum states is determined primarily by their absorption strength. % +Diagonal and cross-peak features decay with a 680 fs time constant characteristic of exciton +recombination and/or trapping. % +The short time dynamics are complicated by coherent and partially coherent pathways that become +important when the excitation pulses are temporally overlapped. % +In this region, the coherent dynamics create diagonal features involving both the excitonic states +and continuum states, while the partially coherent pathways contribute to cross-peak features. % + +\section{Introduction} % ------------------------------------------------------------------------- + +Transition metal dichalcogenides (TMDCs), such as MoS\textsubscript{2}, are layered semiconductors +with strong spin-orbit coupling, high charge mobility, and an indirect band gap that becomes direct +for monolayers. \cite{WangQingHua2012a, MakKinFai2010a} % +The optical properties are dominated by the A and B excitonic transitions between two HOMO +spin-orbit split valence bands and the lowest state of the conduction band at the $K$ and $K^\prime$ +valleys of the two-dimensional hexagonal Brillouin zone. \cite{MolinaSanchezAlejandro2013a} % +The spin and valley degrees of freedom are coupled in individual TMDC layers as a result of the +strong spin-orbit coupling and the loss of inversion symmetry. % +The coupling suppresses spin and valley relaxation since both spin and valley must change in a +transition. % +These unusual properties have motivated the development of TMDC monolayers for next-generation +nano/optoelectronic devices as well as model systems for spintronics and valleytronics +applications. \cite{MakKinFai2010a, XuXiaodong2014a, XiaoDi2012a} % + +Ultrafast dynamics of the MoS\textsubscript{2} A and B electronic states have been measured by +pump-probe, transient absorption, and transient reflection spectroscopy. \cite{FangHui2014a, + KumarNardeep2013a, NieZhaogang2014a, SunDezheng2014a, SimSangwan2013a} % +The spectra contain A and B excitonic features that result from ground-state bleaching (GSB), +stimulated emission (SE), and excited-state absorption (ESA) pathways. % +The excitons exhibit biexponential relaxation times of $\approx$10--20 and $\approx$350--650 fs, +depending on the fluence and temperature. % +The dependence on excitation frequency has not been explored in previous ultrafast experiments on +MoS\textsubscript{2}, but it has played a central role in understanding exciton cooling dynamics +and exciton-phonon coupling in studies of quantum dots. \cite{KambhampatiPatanjali2011a} % + +Coherent multidimensional spectroscopy (CMDS) is a complementary four wave mixing (FWM) methodology +that differs from pump-probe, transient absorption, and transient reflection methods. +\cite{XiaoDi2012a, FangHui2014a, KumarNardeep2013a, NieZhaogang2014a, SimSangwan2013a, + MakKinFai2012a, SunDezheng2014a} % +Rather than measuring the intensity change of a probe beam caused by the state population changes +induced by a pump beam, CMDS measures the intensity of a coherent output beam created by +interactions with three excitation pulses. % +The interest in CMDS methods arise from their ability to remove inhomogeneous broadening, define +interstate coupling, and resolve coherent and incoherent dynamics. \cite{CundiffStevenT2008a, + TurnerDanielB2009a, KohlerDanielDavid2014a, YursLenaA2011a, GriffinGrahamB2013a, HarelElad2012a, + CundiffStevenT1996a, BirkedaDl1996a, WehnerMU1996a} % +CMDS typically requires interferometric phase stability between excitation pulses, so CMDS has been +limited to materials with electronic states within the excitation-pulse bandwidth. % +Multiresonant CMDS is a particularly attractive method for the broader range of complex materials +because it does not require interferometric stability and is able to use independently tunable +excitation pulses over wide frequency ranges. % + +The multiresonant CMDS used in this work employs two independently tunable excitation beams with +frequencies $\omega_1$ and $\omega_2$. % +The $\omega_2$ beam is split into two beams, denoted by $\omega_2$ and $\omega_2^\prime$. % +These three beams are focused onto the MoS\textsubscript{2} thin film at angles, creating an output +beam in the phase-matched direction +$\mathbf{k}_{\mathrm{out}}=\mathbf{k}_1-\mathbf{k}_2+\mathbf{k}_{2^\prime}$ where $\mathbf{k}$ is the wave +vector for each beam and the subscripts label the excitation frequencies. % +Multidimensional spectra result from measuring the output intensity dependence on frequency and +delay times. % + +\begin{figure}[!htb] + \centering + \includegraphics[width=0.5\textwidth]{MX2/01} + \caption[CMDS tutorial]{(a) Example delays of the $\omega_1$, $\omega_2$, and + $\omega_{2^\prime}$ excitation pulses. (b) Dependence of the output intensity on the + $\tau_{22^\prime}$ and $\tau_{21}$ time delays for $\omega_1=\omega_2$. The solid lines define + the regions for the six different time orderings of the $\omega_1$, $\omega_2$, and + $\omega_{2^\prime}$ excitation pulses. We have developed a convention for numbering these time + orderings, as shown. (c) Diagram of the band structure of MoS\textsubscript{2} at the $K$ + point. The A and B exciton transitions are shown. (d) Two dimensional frequency-frequency plot + labeling two diagonal and cross-peak features for the A and B excitons.} + \label{fig:Czech01} +\end{figure} + +\autoref{fig:Czech01} introduces our conventions for representing multidimensional spectra. % +\autoref{fig:Czech01}b,d are simulated data. % +\autoref{fig:Czech01}a shows one of the six time orderings of the three excitation pulses where +$\tau_{22^\prime}\equiv t_2-t_{2^\prime}>0$ and $\tau_{21}\equiv t_2-t_1<0$; that is, the +$\omega_{2^\prime}$ pulse interacts first and the $\omega_1$ pulse interacts last. % +\autoref{fig:Czech01}b illustrates the 2D delay-delay spectrum for all six time orderings when +$\omega_1$ and $\omega_2$ are both resonant with the same state. % +The color denotes the output amplitude. % +Along the negative ordinate where $\tau_{22^\prime}=0$, interactions with the $\omega_2$ and +$\omega_{2^\prime}$ pulses create a population that is probed by $\omega_1$. % +Similarly, along the negative absicissa where $\tau_{21}=0$, interactions with the $\omega_2$ and +$\omega_1$ pulses create a population that is probed by $\omega_{2\prime}$. % +The decay along these axes measures the population relaxation dynamics. % +Note that these delay representations differ from previous publications by our group. +\cite{PakoulevAndreiV2006a} % +This paper specifically explores the dynamics along the ordinate where $\tau_{22^\prime}$ is zero +and the $\tau_{21}$ delay is changed. % + +\autoref{fig:Czech01}c depicts the A and B excitonic transitions between the spin-orbit split +valence bands and the degenerate conduction band states of MoS\textsubscript{2}. % +\autoref{fig:Czech01}d illustrates the 2D frequency-frequency spectrum when $\omega_1$ and +$\omega_2$ are scanned over two narrow resonances. % +The spectrum contains diagonal and cross-peaks that we label according to the excitonic resonances +AA, AB BA, and BB for illustrative purposes. % +The dynamics of the individual quantum states are best visualized by 2D frequency-delay plots, +which combine the features seen in \autoref{fig:Czech01}b,d. % + +This works reports the first multiresonant CMDS spectra of MoS\textsubscript{2}. % +It includes the excitation frequency dependence of the A and B excitonic-state dynamics. % +These experiments provide a fundamental understanding of the multidimensional MoS\textsubscript{2} +spectra and a foundation for interpreting CMDS experiments on more complex TMDC +heterostructures. % +The experimental spectra differ from the simple 2D spectrum shown in \autoref{fig:Czech01}d and +those of earlier CMDS experiments with model systems. % +The line shape of the CMDS excitation spectrum closely matches the absorption spectrum, but the +line shape of the output coherence is dominated by the A and B excitonic features. % +The difference arises from fast, $<70$ fs intraband relaxation from the hot A and B excitons of the +continuum to the band edge. % +A longer, 680 fs relaxation occurs because of trapping and/or exciton dynamics. +\cite{SimSangwan2013a} % +The intensity of the cross-peaks depends on the importance of state filling and intraband +relaxation of hot A excitons as well as the presence of interband population trnasfer of the A and +B exciton states. % + +\section{Methods} % ------------------------------------------------------------------------------ + +\begin{figure}[!htb] + \centering + \includegraphics[width=\textwidth]{MX2/S1} + \caption{Schemiatic of the synthetic setup used for Mo thin film sulfidation reactions.} + \label{fig:CzechS1} +\end{figure} + +MoS\textsubscript{2} thin films were prepared \textit{via} a Mo film sulfidation reaction, similar +to methods reported by \textcite{LaskarMasihhurR2013a}. % +A 1 nm amount of Mo (Kurt J. Lesker, 99.95\%) metal was electron-beam evaporated onto a fused +silica substrate at a rate of 0.05 \AA/s. % +The prepared Mo thin films were quickly transferred to the center of a 1-inch fused silica tub +furnace equipped with gas flow controllers (see \autoref{fig:CzechS1}) and purged with Ar. % +The temperature of the Mo substrate was increased to 900 $^\circ$C over the course of 15 min, after +which 200 mg of sulfur was evaporated into the reaction chamber. % +Sulfidation was carried out for 30 min, and the furnace was subsequently cooled to room +temperature; then the reactor tube was returned to atmospheric pressure, and the +MoS\textsubscript{2} thin film samples were collected. % +The MoS\textsubscript{2} samples were characterized and used for CMDS experiments with no further +preparation. % + +MoS\textsubscript{2} thin film absorption spectra were collected by a Shimadzu 2401PC +ultraviolet-visible spectraphotometer. % +Raman and photoluminescence experiments were carried out in parallel using a Thermo DXR Raman +microscope with a 100x 0.9 NA focusing objective and a 2.0 mW 532 nm excitation source. % +Raman/PL measurements were intentionally performed at an excitation power of $<$8.0 mW to prevent +sample damage. \cite{CastellanosGomezA2012a} % +Contact-mode atomic foce microscopy was performed with an Agilent 5500 AFM. % +MoS\textsubscript{2} film thickness was determined by scratching the sample to provide a clean +step-edge between the MoS\textsubscript{2} film and the fused silica substrate. % +TEM samples were prepared following the method outlined by \textcite{ShanmugamMariyappan2012a} +using concentrated KOH in a 35 $^\circ$C oil bath for 20 minutes. % +The delaminated MoS\textsubscript{2} sample was removed from the basic solution, rinsed five times +with DI water, and transferred to a Cu-mesh TEM grid. % +TEM experiments were performed on a FEI Titan aberration corrected (S)TEM under 200 kV accelerating +voltage. % + +\begin{figure}[!htb] + \centering + \includegraphics[width=\textwidth]{MX2/10} + \caption[Mask and epi vs transmissive.]{(a) Mask. (b) 2D delay spectra at the BB diagonal + ($\omega_1=\omega_2\approx1.95$ eV) for transmissive and reflective geometries. Transmissive + signal is a mixture of MoS\textsubscript{2} signal and a large amount of driven signal from the + substrate that only appears in the pulse overlap region. Reflective signal is representative of + the pure MoS\textsubscript{2} response.} + \label{fig:Czech10} +\end{figure} + +The coherent multidimensional spectroscopy system used a 35 fs seed pulse, centered at 800 nm and +generated by a 1 kHz Tsunami Ti-sapphire oscillator. % +The seed was amplified by a Spitfire-Pro regenerative amplifier. % +The amplified output was split to pump two TOPAS-C collinear optical parametric amplifiers. % +OPA signal output was immediately frequency doubled with BBO crystals, providing two $\approx$50 fs +independently tunable pulses denoted $\omega_1$ and $\omega_2$ with frequencies ranging from 1.62 +to 2.12 eV. % +Signal and idler were not filtered out, but played no role due to their low photon energy. % +Pulse $\omega_2$ was split into pulses labeled $\omega_2$ and $\omega_{2^\prime}$ to create a total +of three excitation pulses. % + +\begin{figure}[!htb] + \centering + \includegraphics[width=\textwidth]{MX2/S4} + \caption{OPA outputs at each color explored.} + \label{fig:CzechS4} +\end{figure} + +In this experiment we use motorized OPAs which allow us to set the output color in software. % +OPA1 and OPA2 were used to create the $\omega_1$ and $\omega_2$ frequencies, respectively. % +In \autoref{fig:CzechS4} we compare the spectral envelope generated by the OPA at each set +color. % +Negative detuning values correspond to regions of the envelope lower in energy than the +corresponding set color. % +The colorbar allows for comparison between set color intensities. % +The fluence values reported correspond to the brightest set color for each OPA. % +A single trace of OPA2 output at set color = 1.95 eV can be found in \autoref{fig:Czech02}. + +After passing through automated delay stages (Newport SMC100 actuators), all three beams were +focused onto the sample surface by a 1 meter focal length spherical mirror in a distorted BOXCARS +geometry to form a 630, 580, and 580 $\mu$m FWHM spot sizes for $\omega_1$, $\omega_2$, and +$\omega_{2^\prime}$, respectively. % + +\begin{figure}[!htb] + \centering + \includegraphics[width=\textwidth]{MX2/S5} + \caption{Spectral delay correction.} + \label{fig:CzechS5} +\end{figure} + +\autoref{fig:CzechS5} represents delay corrections applied for each OPA. % +The corrections were experimentally determined using driven FWM output from fused silica. % +Corrections were approximately linear against photon energy, in agreement with the normal dispersion +of transmissive optics inside our OPAs and between the OPAs and the sample. % +OPA2 required a relatively small correction along $\tau_{22^\prime}$ (middle subplot) to account +for any dispersion experienced differently between the two split beams. % +OPA1 was not split and therefore needed no such correction. % + +\autoref{fig:Czech10}a represents the to-scale mask that defines our distorted BOXCARS +configuration. % +Relative to the center of the BOXCARS mask (small black dot), $\omega_1$, $\omega_2$, and +$\omega_{2^\prime}$ enter the sample at angles of 5.0, 1.5, and 1.0 degrees. % +Each is angled only along the vertical or horizontal dimension, as indicated in +\autoref{fig:Czech10}a. % +This distortion allowed us to remove a large amount of unwanted $\omega_2$ and $\omega_{2^\prime}$ +photons from our signal path (\autoref{fig:Czech10}a red star). % +$\omega_1$ photons were less efficiently rejected, as we show below. % +The center of the BOXCARS mask was brought into the sample at $\approx$45 degrees. % +All three beams had S polarization. % +After reflection, the output beam was isolated using a series of apertures, spectrally resolved +with a monochromator (spectral resolution 9 meV). and detected using a photomultiplier (RCA +C31034A). % + +Our experimental setup allowed for the collection of both transmissive and reflective +(epi-directional) FWM signal. % +The 2D delay spectra in \autoref{fig:Czech10}b show the presence of a large nonresonant +contribution at the origin for the transmissive FWM signal and weaker signals from the +MoS\textsubscript{2} thin film at negative values of $\tau_{21}$ and $\tau_{22^\prime}$. % +The nonresonant contribution is much weaker than the signals from the film for the reflective +signal id is the geometry chosen for this experiment. % +This discrimination between a film and the substrate was also seen in reflective and transmissive +CARS microscopy experiments. \cite{VolkmerAndreas2001a} % + +\begin{figure}[!htb] + \centering + \includegraphics[width=\textwidth]{MX2/11} + \caption[MoS\textsubscript{2} post processing.]{Visualization of data collection and processing. + With the exception of (c), each subsequent pane represents an additional processing step on top + of previous processing. The color bar of each image is separate. (a) Voltages read by the + detector at teach color combination. The large vertical feature is $\omega_1$ scatter; the shape + is indicative of the power curve of the OPA. MoS\textsubscript{2} response can be barely seen + above this scatter. (b) Data after chopping and active background subtraction at the boxcar (100 + shots). (c) The portion of chopped signal that is not material response. This portion is + extracted by averaging several collections at very positive $\tau_{21}$ values, where no material + response is present due to the short coherence times of MoS\textsubscript{2} electronic states. + The largest feature is $\omega_2$ scatter. Cross-talk between digital-to-analog channels can also + be seen as the negative portion that goes as $\omega_1$ intensity. (d) Signal after (c) is + subtracted. (e) Smoothed data. (f) Amplitude level (square root) data. This spectrum corresponds + to that at 0 delay in \autoref{fig:Czech03}. Note that the color bar's range is different than in + \autoref{fig:Czech03}.} + \label{fig:Czech11} +\end{figure} + +Once measured, the FWM signal was sent through a four-stage workup process to create the data set +shown here. % +This workup procedure is visualized in \autoref{fig:Czech11}. % +We use a chopper and boxcar in active background subtraction mode (averaging 100 laser shots) to +extract the FWM signal from $\omega_1$ and $\omega_2$ scatter. % +We collect this differential signal (\autoref{fig:Czech11}b) in software with an additional 50 +shots of averaging. % +In post-process we subtract $\omega_2$ scatter and smooth the data using a 2D Kaiser window. % +Finally, we represent the homodyne collected data as (sig)$^{1/2}$ to make the dynamics and line +widths comparable to heterodyne-collected techniques like absorbance and pump-probe spectra. % +Throughout this work, zero signal on the color bar is set to agree with the average rather than the +minimum of noise. % +Values below zero due to measurement uncertainty underflow the color bar and are plotted in +white. % +This is especially evident in lots such as +120 fs in \autoref{fig:Czech08}, where there is no real +signal. % +IPython \cite{PerezFernando2007a} and matplotlib \cite{HunterJohnD2007a} were important for data +processing and plotting in this work. + +\section{Results and discussion} % --------------------------------------------------------------- + +\begin{figure}[!htb] + \centering + \includegraphics[width=0.75\textwidth]{MX2/02} + \caption[Few-layer MoS\textsubscript{2} thin film characterization.]{Characterization of the + few-layer MoS\textsubscript{2} film studied in this work. Optical images of the + MoS\textsubscript{2} thin film on fused silica substrate in (a) transmission and (b) + reflection. (c) Raman spectrum of the $E_{2g}^1$ and $A_{1g}$ vibrational + modes. (d) High-resolution TEM image and its corresponding FFT shown in the inset. (e) + Absorption (blue), photoluminescence (green), Gaussian fits to the A and B excitons, along with + the residules betwen the fits and absorbance (dotted), A and B exciton centers (dotted) and + representative excitation pulse shape (red).} + \label{fig:Czech02} +\end{figure} + +The few-layer MoS\textsubscript{2} thin film sample studied in this work was prepared on a +transparent fused silica substrate by a simple sufidation reaction of a Mo thin film using a +procedure modified from a recent report. \cite{LaskarMasihhurR2013a} % +\autoref{fig:Czech02}a and b show the homogeneous deposition and surface smoothness of the sample +over the centimeter-sized fused silica substrate, respectively. % +The Raman spectrum shows the $E_{2g}^1$ and $A_{1g}$ vibrational modes (\autoref{fig:Czech02}c) +that are characteristic of MoS\textsubscript{2}. \cite{LiSongLin2012a} % +The transmission electron micrograph (TEM) in \autoref{fig:Czech02}d shows the lattice fringes of +the film with an inset fast Fourier transform (FFT) of the TEM image indicative of the hexagonal +crystal structure of the film corresponding to the 0001 plane of MoS\textsubscript{2}. +\cite{LukowskiMarkA2013a} % +The MoS\textsubscript{2} film thickness was determined to be 2.66 nm by atomic force microscopy and +corresponds to approximately four monolayers. % +\autoref{fig:Czech02}3 shows the absorption and fluorescence spectrum of the film along with the A +and B excitonic line shapes that were extracted from the absorption spectrum. A representative +excitation pulse profile is also shown in red for comparison. % + +\begin{figure}[!htb] + \centering + \includegraphics[width=\textwidth]{MX2/S3} + \caption[MoS\textsubscript{2} absorbance.]{Extraction of excitonic features from absorbance + spectrum. (a) Second derivative spectra of absorbance (black) and fit second derivative + spectrum (green). Gaussian fit parameters are shown in the inset table. (b) Absorption curve + (black), Gaussian fits (blue and red), and remainder (black dotted).} + \label{fig:CzechS3} +\end{figure} + +Extracting the exciton absorbance spectrum is complicated by the large ``rising background'' signal +from other MoS\textsubscript{2} bands. % +With this in mind, we fit the second derivative absorption spectrum to a sum of two second +derivative Gaussians, as seen in \autoref{fig:CzechS3}. % +Conceptually, this method can be thought of as maximizing the smoothness (as opposed to minimizing +the amplitude) of the remainder between the fit and the absorption spectrum. % +The fit parameters can be found in the inset table in \autoref{fig:CzechS3}. % +The Gaussians themselves and the remainder can be found in \autoref{fig:CzechS3}. % + +The multiresonant CMDS experiment uses $\approx$70 fs excitation pulses created by two +independently tunable optical parametric amplifiers (OPAs). % +Automated delay stages and neutral density filters set the excitation time delays over all values +of $\tau_{21}$ with $\tau_{22^\prime}=0$ and the pulse fluence to 90 $\mu$J/cm$^2$ (114 +$\mu$J/cm$^2$) for the $\omega_1$ ($\omega_2$ and $\omega_{2^\prime}$) beam(s). % +Each pulse was focused onto the sample using a distorted BOXCARS configuration. +\cite{EckbrethAlanC1978a} % +The FWM signal was spatially isolated and detected with a monochromator that tracks the output +frequency so $\omega_m = \omega_1$. % +In order to compare the FWM spectra with the absorption spectrum, the signal has been defined as +the square root of the measured FWM signal since FWM depends quadratically on the sample +concentration and path length. % + +\begin{figure}[!htb] + \centering + \includegraphics[width=\textwidth]{MX2/03} + \caption[MoS\textsubscript{2} frequency-frequency slices.]{2D frequency-frequency spectra of the + MoS\textsubscript{2} sample in the epi configuration. In all spectra $\tau_{22^\prime}=0$ fs, + while $\tau_{21}$ is designated in the bottom-right corner of each spectral panel. The color + bar defines the square root of the intensity normalized to the most intense feature in the + series of spectra. The integration of the signal onto the $\hbar\omega_1=\hbar\omega_m$ and + $\hbar\omega_2$ axes are represented ans the blue curves in the top and right side plots, + respectively. The side plots also contain the absorbance spectrum (black line) to aid + intepretation of the dynamics of the integrated 2D signals. The dashed lines mark the centers + of the A and B excitons, as designated from the absorption spectrum.} + \label{fig:Czech03} +\end{figure} + +The main set of data presented in this work is an $\omega_1\omega_2\tau_{21}$ ``movie'' with +$\tau_{22\prime}=0$. +\autoref{fig:Czec03} shows representative 2D frequency-frequency slices from this movie at +increasingly negative $\tau_{21}$ times. % +Each 2D frequency spectrum contains side plots along both axes that compare the absorbance spectrum +(black) to the projection of the integrated signal onto the axis (blue). % +Along $\omega_1$ (which for negative $\tau_{21}$ times acts as the ``probe'') we observe two peaks +corresponding to the A and B excitons. % +In contrast, we see no well-defined excitonic peaks along the $\omega_2$ ``pump'' axis. % +Instead, the signal amplitude increases toward bluer $\omega_2$ values. % +The decrease in FWM above 2.05 eV is caused by a drop in the $\omega_2$ OPA power. + +\begin{figure}[!htb] + \centering + \includegraphics[width=0.75\textwidth]{MX2/04} + \caption[MoS\textsubscript{2} $\omega_1$ Wigner progression.]{Mixed $\omega_1$---$\tau_{21}$ + time---frequency representations of the 3D data set at five ascending $\omega_2$ excitation + frequencies (solid black lines) showing the impact of the $\omega_2$ excitation frequency on + the $\omega_1$ spectral line shape as a function of time. The A and B exciton energies are + marked as dashed lines within each spectrum.} + \label{fig:Czech04} +\end{figure} + +\begin{figure}[!htb] + \centering + \includegraphics[width=0.75\textwidth]{MX2/05} + \caption[MoS\textsubscript{2} $\omega_2$ Wigner progression.]{Mixed $\omega_2$---$\tau_{21}$ + time---frequency representations of the 3D data set at five ascending $\omega_1$ probe + frequencies (solid black lines) showing the impact of the $\omega_1$ excitation frequency on + the $\omega_2$ spectral line shape as a function of time. The A and B exciton energies are + marked as dashed lines within each spectrum.} + \label{fig:Czech05} +\end{figure} + +Figures \ref{fig:Czech04} and \ref{fig:Czech05} show representative 2D frequency-delay slices from +this movie, where the absicissa is the $\omega_1$ or $\omega_2$ frequency, respectively, the +ordinate is the $\tau_{21}$ delay time, and the solid bold lines represent five different +$\omega_2$ or $\omega_1$ frequencies. % +The color bar is normalized to the brightest feature in each subplot. % +This normalization allows comparison of the time dependence of the line shapes, positions, and +relative signal amplitudes along the $\omega_1$ or $\omega_2$ axis directly. % + +Each subplot in \autoref{fig:Czech04} is similar to published pump-probe, transient absorption, multidimensionaland +transient reflection experiments that have measured the electronc dynamics of the A and B excitons. +\cite{XiaoDi2012a, FangHui2014a, KumarNardeep2013a, NieZhaogang2014a, SunDezheng2014a, + SimSangwan2013a, MakKinFai2012a, ThomallaMarkus2006a} % +These previous experiments measure relaxation dynamics on the same $\approx$400-600 fs time scale +that is characteristic of \autoref{fig:Czech04}. % + +Our experiments also show how the spectral features change as a function of the $\omega_2$ +excitation frequency. % +The top to subplots of \autoref{fig:Czech04} reflect the changes in the AA and BA features, while +the bottom two subplots reflect the changes in the AB and BB features. % +The figure highlights the changes in the relative amplitude of the A and B features as a function +of excitation frequency. % +Both the line shapes and the dynamics of the spectral features are very similar. % +\autoref{fig:Czech05} is an excitation spectrum that shows that the dynamics of the spectral +features do not depend strongly on the $\omega_1$ frequency. + +\begin{figure}[!htb] + \centering + \includegraphics[width=0.5\textwidth]{MX2/06} + \caption[Pathway V, VI liouville pathways.]{Liouville pathways for \autoref{fig:Czech04}. gg and + ee designate ground- and excited-state populations, the eg, 2e,e, and e$^\prime$+e,e represent + the excitonic and biexcitonic output coherences, and the arrows are labeled with the + frequencies or population transfer responsible for the transitions. e and e$^\prime$ represent + either A or B excitonic states.} + \label{fig:Czech06} +\end{figure} + +The spectral features in Figures \ref{fig:Czech03}, \ref{fig:Czech04} and \ref{fig:Czech05} depend +on the quantum mechanical interference effects caused by the different pathways. % +\autoref{fig:Czech06} shows all of the Liouville pathways required to understand the spectral +features. \cite{PakoulevAndreiV2010a, PakoulevAndreiV2009a} % +These pathways correspond to the time orderings labeled V and VI in \autoref{fig:Czech02}b. The +letters denote the density matrix elements, $\rho_{ij}$, where g representest the ground state and +e, e$^\prime$ represent any excitonic state. % +Interaction with the temporally overlapped $\omega_2$ and $\omega_{2^\prime}$ pulses excites the ee +excited-state population and bleaches the ground-state population. % +Subsequent interaction with $\omega_1$ creates the output coherences for the diagonal spectral +features when $\omega_1=\omega_2$ or the cross-peak features when $\omega_1\neq\omega_2$. % +The stimulated emission (SE) and ground-state bleaching (GSB) pathways create the eg or e$^\prime$g +output coherences from the ee and gg populations, respectively, while the excited-state absorption +pathway creates the 2e,e or e$^\prime$+e,e biexcitonic output coherences. % +\autoref{fig:Czech06} also includes a population transfer pathway from the ee excited-state +population to an e$^\prime$e$^\prime$ population from which similar SE and ESA pathways occur. % +Since the ESA pathways destructively interfere with the SE and GSB pathways, the output singal +depends on the differences between the pathways. % +Factors that change the biexcitonic output coherences such as the transition moments, state filling +(Pauli blocking), frequency shifts, or dephasing rate changes will control the output signal. % +State filling and ground-state depletion are important factors for MoS\textsubscript{2} since the +transitions excite specific electron and hole spin and valley states in individual layers. % + +The state-filling and ground-state bleaching effects on the diagonal and cross-peak features in +\autoref{fig:Czech03} depend on the spin and valley states in the output coherence. +\cite{XuXiaodong2014a} % +The effects of these spins will disappear as the spin and valley states return to equilibrium. +\cite{ZengHualing2012a, ZhuBairen2014a, MaiCong2013a} +If we assume spin relaxation is negligible, the FWM transitions that create the diagonal features +involve either the A or B ESA transitions, so the resulting 2e,e state includes two spin-aligned +conduction band electrons and valence band holes. % +Similarly, the cross-peak regions denoted by AB or BA in \autoref{fig:Czech01}d will have two +transitions involving an A exciton, so the initial e$^\prime$+e,e state will include antialigned +spins. % +A quantitative treatment of the cancellation effects between the GSB, SE, and ESA pathways requries +knowledge of the transition moments and state degeneracies and is beyond the scope of this paper. +\cite{WongCathyY2011a} % + +The most important characteristic of the experimental spectra is the contrast between the absence +of well-resolved excitonic features that depend on $\omega_2$ in Figures \ref{fig:Czech03} and +\ref{fig:Czech05} and the well-defined excitonic features that depend on $\omega_1$. % +It is also important to note that the projections of the signal amplitude onto the $\omega_2$ axis +in \autoref{fig:Czech03} match closely with the continuum features in the absorption spectrum and +that the line shapes of the features along the $\omega_2$ axis in \autoref{fig:Czech05} do not +change appreciably for different delay times or $\omega_1$ values. % +It shoudl be noted that the excitation pulse bandwidth (see \autoref{fig:Czech02}e) contributes to +the absence of well-resolved A and B excitonic features along $\omega_2$. % +The similarity to the continuum states in the absorption spectrum and the absence of a strong +dependence on $\omega_1$ show that the continuum states observed at higher $\omega_2$ frequencies +participate directly in creating the final output coherences and that their increasing importance +reflects the increasing absorption strength of higher energy continuum states. % +In contrast, the features dependent on $\omega_1$ in Figures \ref{fig:Czech03} and +\ref{fig:Czech04} match the line shapes of the A and B excitonic resonances. % +Although the relative amplitudes of the spectral features depend on the $\omega_2$ frequency, they +do not depend strongly on the delay times. % +These characteristics show that hot A and B excitonic states undergo rapid intraband population +relaxation over a $<$70 fs time scale set by excitation pulses to the A and B excitonic states +excited by $\omega_1$. + +A central feature of Figures \ref{fig:Czech03} and \ref{fig:Czech04} is that the AB region is much +brighter than the BA region. % +This difference is suprising because simple models predict cross-peaks of equal amplitude, as +depicted in \autoref{fig:Czech01}d. % +The symmetry in simple models arises because the AB and BA cross-peaks involve the same four +transitions. % +The symmetry between AB and BA may be broken by material processes such as population relaxation +and transfer, the output coherence dephasing rates, and the bleaching and state-filling effects of +the valence and conduction band states involved in the transitions. % + +We believe that ultrafast intraband population transfer breaks the symmetry of AB and BA +cross-peaks. % +For the BA peak, the interactions with $\omega_2$ and $\omega_{2^\prime}$ generate only A excitons +that do not relax on $<$70 fs time scales. % +For the AB peak, $\omega_2$ and $\omega_{2^\prime}$ generate two kinds of excitons: (1) B excitons +and (2) hot excitons in the A band. % +Relaxation to A may occur by interband transitions of B excitons or intraband transitions of hot A +excitons. % +Either will lead to the GSB, SE, and ESA shown in the ee $\rightarrow$ e$^\prime$e$^\prime$ +population transfer pathways of \autoref{fig:Czech06}. % +This relaxation must occur on the time scale of our pulse-width since the cross-peak asymmetry is +observed even during temporal overlap. % +We believe that intraband relaxation of hot A excitons is the main factor in breaking the symmetry +between AB and BA cross-peaks. % +\autoref{fig:Czech04} shows that B $\rightarrow$ A interband relaxation occurs on a longer time +scale. % +The B/A ratio is higher when $\omega_2$ is resonant with the B excitonic transition than when +$\omega_2$ is lower than the A exciton frequency (the top subplot). % +If population transfer of holes from the B to A valence bands occurred during temporal overlap, the +B/A ratio would be independent of pump frequency at $\tau_21<0$. + +\begin{figure}[!htb] + \centering + \includegraphics[width=\textwidth]{MX2/07} + \caption[MoS\textsubscript{2} transients.]{Transients taken at the different $\omega_1$ and + $\omega_2$ frequencies indicated by the colored markers on the 2D spectrum. The dynamics are + assigned to a 680 fs fast time constant (black solid line) and a slow time constant represented + as an unchanging offset over this timescale (black dashed line).} + \label{fig:Czech07} +\end{figure} + +\autoref{fig:Czech07} shows the delay transients at the different frequencies shown in the 2D +spectrum. % +The colors of the dots on the 2D frequency-frequency spectrum match the colors of the +transients. % +The transients were taken with a smaller step size and a longer time scale than the delay space +explored in the 3D data set. % +The transients are quite similar. % +Our data are consistent with both monomolecular biexponential and bimolecular kinetic models and +cannot discriminate between them. % +We have fit the decay kinetics to a single exponential model with a time constant of 680 fs and an +offset that represents the long time decay. % +The 680 fs decay is similar to previously published pump-probe and transient absorption +experiments. \cite{NieZhaogang2014a, SunDezheng2014a, DochertyCallumJ2014a} % + +\begin{figure}[!htb] + \centering + \includegraphics[width=\textwidth]{MX2/08} + \caption[MoS\textsubscript{2} frequency-frequency slices near pulse overlap.]{2D + frequency-frquency spectra near zero $\tau_{21}$ delay times. The signal amplitude is + normalized to the brightest features in each spectrum.} + \label{fig:Czech08} +\end{figure} + +The spectral features change quantitatively for delay times near temporal overlap. % +\autoref{fig:Czech08} shows a series of 2D spectra for both positive and negative $\tau_{21}$ delay +times with $\tau_{22^\prime}=0$. % +Each spectrum is normalized to its brightest feature. % +The spectra at positive $\tau_{21}$ delay times become rapidly weaker as the delay times become +more positive until the features vanish into the noise at +120 fs. % +The spectra also develop more diagonal character as the delay time moves from negative to positive +values. % +The AB cross-peak is also a strong feature in the spectrum at early times. % + +\begin{figure}[!htb] + \centering + \includegraphics[width=0.5\textwidth]{MX2/09} + \caption[Pathways I, III Liouville pathways.]{Liouville pathways for the $\omega_1$, $\omega_2$, + and $\omega_{2^\prime}$ time ordering of pulse interactions. e and e$^\prime$ represent either + A or B excitonic states.} + \label{fig:Czech09} +\end{figure} + +The pulse overlap region is complicated by the multiple Liouville pathways that must be +considered. % +Additionally, interference between scattered light from the $\omega_1$ excitation beam and the +output signal becomes a larger factor as the FWM signal decreases. % +\autoref{fig:Czech09} shows the $\omega_1$, $\omega_2$, and $\omega_{2^\prime}$ time ordered +pathway that becomes and important consideration for positive $\tau_{21}$ delay times. % +Since $\tau_{22^\prime}=0$, the initial $\omega_1$ pulse creates an excited-state coherence, while +the subsequent $\omega_2$ and $\omega_{2^\prime}$ pulses create the output coherence. % +The output signal is only important at short $\tau_{21}>0$ values because the initially excited +coherence dephases very rapidly. % +When $\omega_1\neq\omega_2$, the first two interactions create an e$^\prime$e zero quantum +coherence that also dephases rapidly. % +However, when $\omega_1=\omega_2$, the first two interactions create an ee, gg population +difference that relaxes on linger time scales. % +The resulting signal will therefore appear as the diagonal feature in \autoref{fig:Czech08} +(\textit{e.g.}, see the +40 fs 2D spectrum). % +In addition to the diagonal feature in \autoref{fig:Czech08}, there is also a vertical feature when +$\omega_1$ is resonant with the A excitonic transition as well as the AB cross-peak. % +These features are attributed to the pathways in \autoref{fig:Czech06}. % +Although these pathways are depressed when $\tau_{21}>0$, there is sufficient temporal overlap +between the $\omega_2$, $\omega_{2^\prime}$, and $\omega_1$ pulses to make their contribution +comparable to those in \autoref{fig:Czech09}. % +More positie values of $\tau_{21}$ emphasize the \autoref{fig:Czech09} pathways over the +\autoref{fig:Czech06} pathways, accounting for the increasing percentage of diagonal character at +increasingly positive delays. % + +\section{Conclusions} % -------------------------------------------------------------------------- + +This paper presents the first coherent multidimensional spectroscopy of MoS\textsubscript{2} thin +films. % +CMDS methods are related to the earlier ultrafast pump-probe and transient absorption methods since +they all share bleaching, stimulated emission, Pauli blocking, and excited-state absorption +pathways, but they differ in how these pathways define the spectra. % +In addition, CMDS methods have many additional pathways that become important when the coherence +dephasing times are longer than the excitation pulse widths. % +In this work, the dephasing times are short so the pathways are identical to transient +absorption. % +This work reports the first frequency-frequency-delay spectra of MX\textsubscript{2} samples. % +These spectra are complementary to previous work because they allow a direct comparison between the +initially excited excitonic states and the states creating the final output coherence. % +The spectra show that the same hot A and B exciton continuum states that are observed in the +absorption spectrum also dominate the CMDS excitation spectra. % +They also show that rapid, <70 fs intraband relaxation occurs to create the band-edge A and B +excitonic features observed in the CMSD spectrum. % +The relative intensity of the diagonal peak features depends on the relative absorption strength of +the A and B excitons. % +The relative intensity of cross-peak features in the 2D spectra depends on the excitation +frequency. % +Excitation at or above the B exciton feature creates strong cross-peaks associated with hot A and B +excitons that undergo ultrafast intraband population transfer. % +Excitation below the B excitonic feature creates a weak cross-peak indicating A-induced B-state +bleaching but at a lower signal level corresponding to the lower optical density at this energy. % +Population relaxation occurs over $\approx$680 fs, either by transfer to traps or by bimolecular +charge recombination. % + +These experiments provide the understanding of MoS\textsubscript{2} coherent multidimensional +spectra that will form the foundation required to measure the dynamical processes occurring in more +complex MoS\textsubscript{2} and other TMDC heterostructures with quantum-state resolution. % +The frequency domain based multiresonant CMDS methods described in this paper will play a central +role in these measurements. % +They use longer, independently tunable pulses that provide state-selective excitation over a wide +spectral range without the requirement for interferometric stability. % + |
